v uchun yechish (complex solution)
v=-\frac{\sqrt[4]{3x-1}+1}{x}
x\neq 0
v uchun yechish
v=-\frac{\sqrt[4]{3x-1}+1}{x}
x\geq \frac{1}{3}
Grafik
Baham ko'rish
Klipbordga nusxa olish
-vx=\sqrt[4]{3x-1}+1
Shartlarni qayta saralash.
\left(-x\right)v=\sqrt[4]{3x-1}+1
Tenglama standart shaklda.
\frac{\left(-x\right)v}{-x}=\frac{\sqrt[4]{3x-1}+1}{-x}
Ikki tarafini -x ga bo‘ling.
v=\frac{\sqrt[4]{3x-1}+1}{-x}
-x ga bo'lish -x ga ko'paytirishni bekor qiladi.
v=-\frac{\sqrt[4]{3x-1}+1}{x}
\sqrt[4]{3x-1}+1 ni -x ga bo'lish.
-vx=\sqrt[4]{3x-1}+1
Shartlarni qayta saralash.
\left(-x\right)v=\sqrt[4]{3x-1}+1
Tenglama standart shaklda.
\frac{\left(-x\right)v}{-x}=\frac{\sqrt[4]{3x-1}+1}{-x}
Ikki tarafini -x ga bo‘ling.
v=\frac{\sqrt[4]{3x-1}+1}{-x}
-x ga bo'lish -x ga ko'paytirishni bekor qiladi.
v=-\frac{\sqrt[4]{3x-1}+1}{x}
\sqrt[4]{3x-1}+1 ni -x ga bo'lish.
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